POLYNOMIAL APPROXIMATION OF HIGH-DIMENSIONAL HAMILTON JACOBI BELLMAN EQUATIONS AND APPLICATIONS TO FEEDBACK CONTROL OF SEMILINEAR PARABOLIC PDES

被引：67

作者：

Kalise, Dante ^{[1
]}

Kunisch, Karl ^{[2
,3
]}

机构：

[1] Imperial Coll London, Dept Math, South Kensington Campus, London SW7 2AZ, England

[2] Karl Franzens Univ Graz, Inst Math & Sci Comp, Heinrichstr 36, A-8010 Graz, Austria

[3] Austrian Acad Sci, Johann Radon Inst Computat & Appl Math RICAM, Altenberger Str 69, A-4040 Linz, Austria

来源：

SIAM JOURNAL ON SCIENTIFIC COMPUTING | 2018年 / 40卷 / 02期

关键词：

optimal feedback control; Hamilton-Jacobi-Bellman equations; nonlinear dynamics; polynomial approximation; high-dimensional approximation; STABILIZATION;

D O I：

10.1137/17M1116635

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

A procedure for the numerical approximation of high-dimensional Hamilton-Jacobi-Bellman (HJB) equations associated to optimal feedback control problems for semilinear parabolic equations is proposed. Its main ingredients are a pseudospectral collocation approximation of the PDE dynamics and an iterative method for the nonlinear HJB equation associated to the feedback synthesis. The latter is known as the successive Galerkin approximation. It can also be interpreted as Newton iteration for the HJB equation. At every step, the associated linear generalized HJB equation is approximated via a separable polynomial approximation ansatz. Stabilizing feedback controls are obtained from solutions to the HJB equations for systems of dimension up to fourteen.

引用

页码：A629 / A652

页数：24

共 6 条

[1] Robust Feedback Control of Nonlinear PDEs by Numerical Approximation of High-Dimensional Hamilton-Jacobi-Isaacs Equations
Kalise, Dante
Kundu, Sudeep
Kunisch, Karl
SIAM JOURNAL ON APPLIED DYNAMICAL SYSTEMS, 2020, 19 (02): : 1496 - 1524
[2] TENSOR DECOMPOSITION METHODS FOR HIGH-DIMENSIONAL HAMILTON-JACOBI-BELLMAN EQUATIONS
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Kalise, Dante
Kunisch, Karl K.
SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2021, 43 (03) : A1625 - A1650
[3] ADAPTIVE DEEP LEARNING FOR HIGH-DIMENSIONAL HAMILTON-JACOBI-BELLMAN EQUATIONS
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Gong, Qi
Kang, Wei
SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2021, 43 (02) : A1221 - A1247
[4] Error bounds for monotone approximation schemes for parabolic Hamilton-Jacobi-Bellman equations
Barles, Guy
Jakobsen, Espen R.
MATHEMATICS OF COMPUTATION, 2007, 76 (260) : 1861 - 1893
[5] THE VISCOSITY APPROXIMATION TO THE HAMILTON-JACOBI-BELLMAN EQUATION IN OPTIMAL FEEDBACK CONTROL: UPPER BOUNDS FOR EXTENDED DOMAINS
Richardson, Steven
Wang, Song
JOURNAL OF INDUSTRIAL AND MANAGEMENT OPTIMIZATION, 2010, 6 (01) : 161 - 175
[6] ACTOR-CRITIC METHOD FOR HIGH DIMENSIONAL STATIC HAMILTON-JACOBI-BELLMAN PARTIAL DIFFERENTIAL EQUATIONS BASED ON NEURAL NETWORKS
Zhou, Mo
Han, Jiequn
Lu, Jianfeng
SIAM JOURNAL ON SCIENTIFIC COMPUTING, 2021, 43 (06) : A4043 - A4066

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